1. Linear Hyperbolic Systems on Networks
- Author
-
Fijav��, Marjeta Kramar, Mugnolo, Delio, and Nicaise, Serge
- Subjects
Mathematics - Functional Analysis ,Mathematics - Analysis of PDEs ,FOS: Mathematics ,FOS: Physical sciences ,Mathematical Physics (math-ph) ,47D06, 35L40, 34B45, 81Q35 ,Mathematical Physics ,Analysis of PDEs (math.AP) ,Functional Analysis (math.FA) - Abstract
We study hyperbolic systems of one-dimensional partial differential equations under general, possibly non-local boundary conditions. A large class of evolution equations, either on individual 1-dimensional intervals or on general networks, can be reformulated in our rather flexible formalism, which generalizes the classical technique of first-order reduction. We study forward and backward well-posedness; furthermore, we provide necessary and sufficient conditions on both the boundary conditions and the coefficients arising in the first-order reduction for a given subset of the relevant ambient space to be invariant under the flow that governs the system. Several examples are studied.
- Published
- 2020